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limiting sums (1 Viewer)

jet

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To build gurmies' answer, if |r| < 1, then the series will converge to a value, instead of diverging to infinity, if |r| > 1. If these series converges, then we can find its sum, though, if it diverges, the sum, as n -> infinity, is infinite.
 
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kurt.physics

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To build gurmies' answer, if r < |1|, then the series will converge to a value, instead of diverging to infinity, if r > |1|. If these series converges, then we can find its sum, though, if it diverges, the sum, as n -> infinity, is infinite.
Dont you mean |r| < 1 ... ;P
 

cutemouse

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what i dont get is how ppl who haven't studied 2u maths for over a year still remember this stuff?

i studied it LAST TERM and i'm already forgetting.
This stuff is easy, it's all essentially the same. All you need to remember for a limit sum is that |r|<1 and a/(1-r) ... Not really that hard IMO.
 

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